def loads_public_key(cls, obj):
curve = cls.DSS_CURVES[obj['crv']]()
public_numbers = EllipticCurvePublicNumbers(
base64_to_int(obj['x']),
base64_to_int(obj['y']),
curve,
)
return public_numbers.public_key(default_backend())
def load_public_key(self):
curve = self.DSS_CURVES[self._dict_data['crv']]()
public_numbers = EllipticCurvePublicNumbers(
base64_to_int(self._dict_data['x']),
base64_to_int(self._dict_data['y']),
curve,
)
return public_numbers.public_key(default_backend())
def load_private_key(self):
obj = self._dict_data
if 'oth' in obj: # pragma: no cover
# https://tools.ietf.org/html/rfc7518#section-6.3.2.7
raise ValueError('"oth" is not supported yet')
public_numbers = RSAPublicNumbers(base64_to_int(obj['e']),
base64_to_int(obj['n']))
if has_all_prime_factors(obj):
numbers = RSAPrivateNumbers(d=base64_to_int(obj['d']),
p=base64_to_int(obj['p']),
q=base64_to_int(obj['q']),
dmp1=base64_to_int(obj['dp']),
dmq1=base64_to_int(obj['dq']),
iqmp=base64_to_int(obj['qi']),
public_numbers=public_numbers)
else:
d = base64_to_int(obj['d'])
p, q = rsa_recover_prime_factors(public_numbers.n, d,
public_numbers.e)
numbers = RSAPrivateNumbers(d=d,
p=p,
q=q,
dmp1=rsa_crt_dmp1(d, p),
dmq1=rsa_crt_dmq1(d, q),
iqmp=rsa_crt_iqmp(p, q),
public_numbers=public_numbers)
return numbers.private_key(default_backend())
def loads(self, obj):
for k in ['crv', 'x', 'y']:
if k not in obj:
raise ValueError('Not a elliptic curve key')
curve = self.DSS_CURVES[obj['crv']]()
public_numbers = EllipticCurvePublicNumbers(
base64_to_int(obj['x']),
base64_to_int(obj['y']),
curve,
)
if 'd' in obj:
private_numbers = EllipticCurvePrivateNumbers(
base64_to_int(obj['d']), public_numbers)
return private_numbers.private_key(default_backend())
return public_numbers.public_key(default_backend())
def loads_private_key(self, obj):
if 'oth' in obj:
# https://tools.ietf.org/html/rfc7518#section-6.3.2.7
return self.loads_other_primes_info(obj)
props = ['p', 'q', 'dp', 'dq', 'qi']
props_found = [prop in obj for prop in props]
any_props_found = any(props_found)
if any_props_found and not all(props_found):
raise ValueError('RSA key must include all parameters if any are present besides d')
public_numbers = RSAPublicNumbers(
base64_to_int(obj['e']), base64_to_int(obj['n'])
)
if any_props_found:
numbers = RSAPrivateNumbers(
d=base64_to_int(obj['d']),
p=base64_to_int(obj['p']),
q=base64_to_int(obj['q']),
dmp1=base64_to_int(obj['dp']),
dmq1=base64_to_int(obj['dq']),
iqmp=base64_to_int(obj['qi']),
public_numbers=public_numbers
)
else:
d = base64_to_int(obj['d'])
p, q = rsa_recover_prime_factors(
public_numbers.n, d, public_numbers.e
)
numbers = RSAPrivateNumbers(
d=d,
p=p,
q=q,
dmp1=rsa_crt_dmp1(d, p),
dmq1=rsa_crt_dmq1(d, q),
iqmp=rsa_crt_iqmp(p, q),
public_numbers=public_numbers
)
return numbers.private_key(default_backend())
def loads_public_key(self, obj):
numbers = RSAPublicNumbers(base64_to_int(obj['e']),
base64_to_int(obj['n']))
return numbers.public_key(default_backend())
def assertBase64IntEqual(self, x, y):
self.assertEqual(base64_to_int(x), base64_to_int(y))
def load_public_key(self):
numbers = RSAPublicNumbers(base64_to_int(self._dict_data['e']),
base64_to_int(self._dict_data['n']))
return numbers.public_key(default_backend())
